The logistic map has been used to describe period doubling bifurcations for periodically modulated lasers. It also represents an asymptotic approximation of Ikeda's map for a passive ring cavity. Because various control methods have been used recently to stabilize branches of periodic solutions in lasers, we investigate the logistic map with a standard Ott, Grebogi and Yorke (OGY) control. We explore the structure of this map plus perturbations and find considerable modifications to its bifurcation diagram. In addition to the original fixed points, we find a new fixed point and new period doubling bifurcations. We show that for certain values of small perturbations the new fixed point of the perturbed logistic map is stable, while its origi...
This paper compares three different types of “onset of chaos” in the logistic and generalized logist...
[[abstract]]Electronic-controlled route to chaos in a quantum-well laser diode is carried out by a d...
In the past decade the understanding of stability and chaotic behaviour of nonlinear systems has mad...
We study the period-doubling bifurcations to chaos in a logistic map with a nonlinearly modulated pa...
International audienceIt is well known that external-cavity lasers (ECLs) subjected to opt...
We discuss in detail the interesting phenomenon of wavelength-doubling bifurcations in the model of ...
We study the logistic mapping with the nonlinearity parameter varied through a delayed feedback mech...
By introducing a periodic perturbation in the control parameter of the logistic map we have investig...
We consider the logistic map wherein the nonlinearity parameter is periodically modulated. For low p...
The iterative map xn+1 = rnxn„ (1-xn) is investigated with rn changing periodically between two valu...
We study the period-doubling bifurcations to chaos in a logistic map with a nonlinearly modulated pa...
2003Some important ideas froni classical control theory are introduced with the intention of applyin...
We report an interesting phenomenon of wavelength doubling bifurcations in the model of coupled (log...
We demonstrate that the dynamics of an autonomous chaotic class C laser can be controlled to a perio...
This paper compares three different types of "onset of chaos" in the logistic and generalized logist...
This paper compares three different types of “onset of chaos” in the logistic and generalized logist...
[[abstract]]Electronic-controlled route to chaos in a quantum-well laser diode is carried out by a d...
In the past decade the understanding of stability and chaotic behaviour of nonlinear systems has mad...
We study the period-doubling bifurcations to chaos in a logistic map with a nonlinearly modulated pa...
International audienceIt is well known that external-cavity lasers (ECLs) subjected to opt...
We discuss in detail the interesting phenomenon of wavelength-doubling bifurcations in the model of ...
We study the logistic mapping with the nonlinearity parameter varied through a delayed feedback mech...
By introducing a periodic perturbation in the control parameter of the logistic map we have investig...
We consider the logistic map wherein the nonlinearity parameter is periodically modulated. For low p...
The iterative map xn+1 = rnxn„ (1-xn) is investigated with rn changing periodically between two valu...
We study the period-doubling bifurcations to chaos in a logistic map with a nonlinearly modulated pa...
2003Some important ideas froni classical control theory are introduced with the intention of applyin...
We report an interesting phenomenon of wavelength doubling bifurcations in the model of coupled (log...
We demonstrate that the dynamics of an autonomous chaotic class C laser can be controlled to a perio...
This paper compares three different types of "onset of chaos" in the logistic and generalized logist...
This paper compares three different types of “onset of chaos” in the logistic and generalized logist...
[[abstract]]Electronic-controlled route to chaos in a quantum-well laser diode is carried out by a d...
In the past decade the understanding of stability and chaotic behaviour of nonlinear systems has mad...